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Riesz transforms on generalized Heisenberg groups and Riesz transforms associated to the CCR heat flow. (English) Zbl 1061.43013

Inspired by a method of G. Pisier [Riesz transforms: A simpler analytic proof of P. A. Meyer’s inequality. Séminaire de probabilités XXII, Strasbourg/France, Lect. Notes Math. 1321, 485–501 (1988; Zbl 0645.60061)], the author obtains here estimates for the norm of the Riesz transforms \(R_k\) in two different settings: in the first case the Riesz transforms act on \(L^q(G)\), \(1< q<\infty\), where \(G\) is a generalized Heisenberg group. In the second case the Riesz transforms act on the Schatten space \(S_q(H)\), defined by commuting inner *-derivations on the \(C^*\)-algebra \(K(H)\) of compact operators on a Hilbert space \(H\).

MSC:

43A80 Analysis on other specific Lie groups
46L60 Applications of selfadjoint operator algebras to physics
46L57 Derivations, dissipations and positive semigroups in \(C^*\)-algebras

Citations:

Zbl 0645.60061
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